AbstractRecently, Type IV self-dual codes over rings of order 4 have been introduced as self-dual codes over the rings with the property that all Hamming weights are even. All Type IV self-dual codes over Z4 of lengths up to 16 are known. In this paper, the classification of such codes of length 20 is given. The highest minimum Hamming, Lee and Euclidean weights of Type IV Z4-codes of lengths up to 40 and length 56 are also determined
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
AbstractRecently, Type IV self-dual codes over rings of order 4 have been introduced as self-dual co...
AbstractThe classification of all self-dual codes over Z4 of length up to 15 and Type II codes of le...
AbstractThe optimal minimal Euclidean norm of self-dual codes over Z4 is known through length 24; th...
AbstractThe optimal minimal Euclidean norm of self-dual codes over Z4 is known through length 24; th...
AbstractMichael Klemm has recently studied the conditions satisfied by the complete weight enumerato...
AbstractIn this note, we investigate Type I codes over Z4 constructed from Hadamard matrices. As an ...
AbstractFor lengths up to 47 except 37, we determine the largest minimum Euclidean weight among all ...
AbstractThe classification of all self-dual codes over Z4 of length up to 15 and Type II codes of le...
AbstractType II Z4-codes are a remarkable class of self-dual Z4-codes. A Type II Z4-code of length n...
International audienceThere is a special local ring E of order 4, without identity for the multiplic...
AbstractThis article is a survey of the current status of the classification and enumeration of self...
AbstractIn this note, we investigate Type I codes over Z4 constructed from Hadamard matrices. As an ...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
AbstractRecently, Type IV self-dual codes over rings of order 4 have been introduced as self-dual co...
AbstractThe classification of all self-dual codes over Z4 of length up to 15 and Type II codes of le...
AbstractThe optimal minimal Euclidean norm of self-dual codes over Z4 is known through length 24; th...
AbstractThe optimal minimal Euclidean norm of self-dual codes over Z4 is known through length 24; th...
AbstractMichael Klemm has recently studied the conditions satisfied by the complete weight enumerato...
AbstractIn this note, we investigate Type I codes over Z4 constructed from Hadamard matrices. As an ...
AbstractFor lengths up to 47 except 37, we determine the largest minimum Euclidean weight among all ...
AbstractThe classification of all self-dual codes over Z4 of length up to 15 and Type II codes of le...
AbstractType II Z4-codes are a remarkable class of self-dual Z4-codes. A Type II Z4-code of length n...
International audienceThere is a special local ring E of order 4, without identity for the multiplic...
AbstractThis article is a survey of the current status of the classification and enumeration of self...
AbstractIn this note, we investigate Type I codes over Z4 constructed from Hadamard matrices. As an ...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
The optimal minimal Euclidean norm of self-dual codes over ℤ_4 is known through length 24; the purpo...
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